两自由度系统摩擦自振动的分析研究

E. Kalinin, S. Lebedev, Yu. Kozlov
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引用次数: 0

摘要

摘要本研究的目的是研究两自由度系统中摩擦自激振荡的性质。作为一种研究方法,N.N.Bogolyubov和Y.a.Metropolitan的渐近方法。研究方法。这项工作的方法论基础是对共振模式下系统动力学的已知科学结果进行概括和分析,并使用系统方法。运用分析方法和比较分析法,形成科学的问题、目标和研究目标的制定。在开发经验模型时,使用了系统稳定性理论、系统分析方法和函数研究的主要规定。研究结果。考虑具有两个自由度的系统,假设摩擦函数由滑动速度的三次多项式近似,并且摩擦仅应用于其中一个质量。排除对应于第三自由度的均匀旋转,导致不考虑摩擦力矩,而是考虑摩擦力矩和移动力的力矩之间的差异。通过对方程解的结果的分析,我们可以得出结论,在精度达到一阶近似(包括在内)的情况下,自激振荡以等于系统固有频率的恒定频率发生。这与其他作者使用其他方法得出的结论一致。发现振幅的平稳值。以下四种情况是可能的:平凡解对应于无振荡系统的均匀旋转;具有所述第一频率的单频振荡;具有第二频率的单频振荡;双频振荡模式。结论。G.Boyadzhiev的方法可用于研究多质量自振荡系统,并以渐近展开的形式给出了其任意精度的一般解。所获得的稳态稳定性条件证实了实验结果,即在多质量系统中,只有在摩擦特性的下降段才可能发生自激振荡。发展中的振动的性质——它们的频率和组成谐波的振幅比——完全由系统的结构、弹性和惯性特性决定。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
ANALYTICAL STUDY OF FRICTIONAL AUTO-VIBRATIONS IN SYSTEMS WITH TWO DEGREES OF FREEDOM
Abstract Purpose of the study is to study the properties of frictional self-oscillations in systems with two degrees of freedom. As a research method, the asymptotic method of N.N. Bogolyubov and Y.A. Metropolitan. Research methods. The methodological basis of the work is the generalization and analysis of the known scientific results of the dynamics of systems in resonance modes and the use of a systematic approach. The analytical method and comparative analysis were used to form a scientific problem, goal and formulation of research objectives. When developing empirical models, the main provisions of the theory of stability of systems, methodology of system analysis and research of functions were used. The results of the study. A system with two degrees of freedom is considered, assuming that the friction function is approximated by a cubic polynomial in the sliding velocity, and friction is applied only to one of the masses. The exclusion of uniform rotation, corresponding to the third degree of freedom, leads to consideration not of the frictional moment, but the difference between the frictional moment and the moment of the moving forces. From the analysis of the results of the solutions of the equation, we can conclude that, with an accuracy up to the first approximation, inclusive, self-oscillations occur with constant frequencies equal to the natural frequencies of the system. This is consistent with the conclusions of other authors obtained using other methods. Stationary values of the amplitudes are found. The following four cases are possible: trivial solution corresponding to uniform rotation of the system without oscillations; single frequency oscillations with the first frequency; single frequency oscillations with a second frequency; two-frequency oscillatory mode. Conclusions. G. Boyadzhiev's method can be applied to study multi-mass self-oscillating systems and gives their general solution in the form of asymptotic expansions to any degree of accuracy. The obtained conditions for the stability of stationary regimes confirm the experimental results that in multi-mass systems, self-oscillations are possible only in the falling sections of the friction characteristics. The nature of the developing vibrations - their frequency and the ratio of the amplitudes of the constituent harmonics - is completely determined by the structure of the system, its elastic and inertial properties.
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